1.
CASL2025
1.1.
Jessica Fintzen: Representation of p-adic Groups
1.2.
Zhiwei Yun: Hitchin Moduli Spaces and Wildly Ramified Geometric Langlands
1.3.
Tony Feng: Modular Functoriality in Local Langlands
1.4.
Xinchun Ma: Cherednik Algebras and Hilbert Schemes
1.5.
Jeremy Taylor: universal monodromic Bezrukavnikov equivalence
1.6.
Joakim Faergeman: Singular support for $G$-categories and applications $W$-algebras
1.7.
Sam Raskin: Introduction to GLC
1.8.
David Yang:On the Classification of $G(\!(t)\!)$-categories
1.9.
Nakajima: Relative Langlands
1.10.
Gubir Dhillon: modular representation of affine Lie algebras
1.11.
Sanath Devalapurkar: Ruminations about Langlands duality with generalized coefficients
1.12.
Ekaterina Bogdanova: Non-vanishing of quantum geometric Whittaker coefficients
1.13.
Taeuk Nam: Tamely Ramified Geometric Langlands
1.14.
Kenta Suzuki: Fargues Categorical Conjecture for Elliptic Parameters for SL(n)
1.15.
Dmitry Kubrak: cohomology of BG via derived geometric Satake
2.
Calder's course on modular representations
2.1.
Introduction
2.2.
Classification of Simple Modules
2.3.
Lusztig' Character Formula
2.4.
Soegel's Modular Category $\mathcal{O}$
2.5.
Soegel Bimodules
2.6.
Parity-sheaves
2.7.
Tilting modules
2.8.
Williamson's Counterexample
2.9.
Highest Weight Categories
2.10.
Tilting character formula
2.11.
Proof of Finkelberg-Mirkovic Conjecture
2.12.
Representation of $G(\mathbb{F}_ {q})$
2.13.
Lusztig's Conjecture
2.14.
Nice Basis
2.15.
Consruction of $M_ {w}$
2.16.
Uniquenss of $M_ {w}$ and Failure of Lusztig's Conjecture
2.17.
Exceptional Collection
3.
Categorical Local Langlands
3.1.
Introduction and Motivations
3.2.
Stacks of Langlands Parameters
3.3.
Inductions
3.4.
Spectral Deligne-Lusztig Induction via Categorical Trace
3.5.
A Sheaf Theoretic Approach to Deligne-Lusztig Theory
3.6.
Algebraic Geometry of Infinite Type
3.7.
Categorical Local Langlands
Home
/
Shurui Liu's Notes
/
Calder's course on modular representations
Notes on Calder’s lectures at Stanford, 2025 Spring.
<
>
Keyboard Shortcuts
Vim Navigation
h
Previous Page
l
Next Page
j
Scroll Down
k
Scroll Up
u
Up to Chapter
d
Next Chapter
g
Jump to Top
G
Jump to Bottom
o
Jump Back
Utilities
/
Focus Search
f
Open/Close Link Options
r
Reload
H
History Back
L
History Fwd
?
Open/Close Help
Esc
Focus Document
s
Toggle ScrollSpy
a
Fishing (goof around)
i
Idle Inside Matrix
Left Bar
[
Toggle Visible
c
Toggle Collapse
Right Bar
]
Toggle Visible
v
Toggle Collapse
J
Scroll Down
K
Scroll Up
Appearance
t
Toggle Theme
\
Toggle Header
F
Toggle Full Screen
